The forces involved in projectile motion are the initial velocity of the projected object at a certain angle and gravity acting downward on the object. The vector nature of forces can be used to determine how far an object launched can go and its initial velocity at an angle of O by finding its x and y components separately. The components of velocity are found by taking the initial velocity multiplied by sin for they component, and coos for the x component. To find the initial velocity, we had to plug in specific values into he equation, v=0. G(x/y), all raised to the one-half power, which was equal to 2. 5 m/s. This equation is derived from the equation for the vertical component of the motion which is y=0. City. Also, the time of flight can be found. It can be found with the equation rye+VT-O. Get. After solving fort, we find that the ball is in flight for 0. 94 seconds. After finding the time of flight, we were able to then find how far the ball went, or the range, by using the initial velocity and time of flight by the equation x=box, to find that the range is equal to 2. 5 meters.
The procedure to find all the values varied to find each one. First, to find the maximum range at which the ball travels, the ball had to be fired at various angles. After doing so, we found that an angle of 45 produces that greatest range. Second, to find the initial velocity we fired the ball completely horizontally and measured how far it went and used the initial velocity to find the resulting initial velocity. Lastly, we fired the ball at an angle of 55 five times and found the average range and compared our experimental value with the theoretical value o come up with a 10% error.
Once we found the initial velocity, we could use it to find the range and how long the ball was in the air. Our percent deviation in the range was 10% which is rather high considering the experiment and conditions. In analysis, we see that doubling the velocity causes the range to increase by four times, because the range and initial velocity are directly related (x is directly related to v). Further, the range will be affected just a little bit (approximately 1. 4 times) further when doubling the initial height.
In this experiment we learned how to determine the initial velocity of a ball that is launched horizontally out of a projectile launcher, how to verify the angle of projection that will produce maximum range, and to predict and verify the range that a ball will travel when launched at a set angle. In conclusion, the final range we predicted compared to the range we found in the experiment was no good because our percent deviation was 10%. This could be due to many different errors, such as errors in measurement, air resistance, stability, etc.